对数导数的高阶导数及其运算性质

The Higher-order Derivative of Logarithmic Derivative and Its Operational Rules

通过对重要极限limΔx→ 0 (1+Δx) 1Δx=e的变换 ,结合函数加减、乘数等运算寻找到了指数导数的运算规律 ,并把这些定理与公式应用到定义高阶对数导数理论中 。

In this paper, by way of the important limit (lim)Δx→0(1+Δx)^(1Δx)=e the sufficient and necessary conditions, equal relations between the exponential derivative and the derivative are proved, some operational rules in addition, subtraction, numerical multiplication of functions are obtained, the theorems and formulas are applied to define higher-order logarithmic derivatives, the operational rules of higher-order logarithmic derivatives are proved.